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https://doi.org/10.1134/s0012266117030016
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Cite Journal: Differential Equations |  Publication Date: Mar 1, 2017 |
 Citations: 4 |
Affiliation: Yaroslavl State University
We study a special class of diffeomorphisms of an annulus (the direct product of a ball in ℝ k , k ≥ 2, by an m-dimensional torus). We prove the so-called annulus principle; i.e., we suggest a set of sufficient conditions under which each diffeomorphism in a given class has an m-dimensional expanding hyperbolic attractor.
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